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Implement twisted Edwards point conversion and addition in the circuit.

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Sean Bowe 2017-12-22 11:51:00 -07:00
parent 8e3bef80a4
commit 07f2e553a7
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1 changed files with 319 additions and 2 deletions
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321
src/circuit/mont.rs
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@ -26,12 +26,216 @@ use ::jubjub::{
montgomery montgomery
}; };
pub struct EdwardsPoint<E: Engine, Var> {
x: AllocatedNum<E, Var>,
y: AllocatedNum<E, Var>
}
impl<E: JubjubEngine, Var: Copy> EdwardsPoint<E, Var> {
/// This extracts the x-coordinate, which is an injective
/// encoding for elements of the prime order subgroup.
pub fn into_num(&self) -> AllocatedNum<E, Var> {
self.x.clone()
}
/// Perform addition between any two points
pub fn add<CS>(
&self,
mut cs: CS,
other: &Self,
params: &E::Params
) -> Result<Self, SynthesisError>
where CS: ConstraintSystem<E, Variable=Var>
{
// Compute U = (x1 + y1) * (x2 + y2)
let u = AllocatedNum::alloc(cs.namespace(|| "U"), || {
let mut t0 = *self.x.get_value().get()?;
t0.add_assign(self.y.get_value().get()?);
let mut t1 = *other.x.get_value().get()?;
t1.add_assign(other.y.get_value().get()?);
t0.mul_assign(&t1);
Ok(t0)
})?;
cs.enforce(
|| "U computation",
LinearCombination::<Var, E>::zero() + self.x.get_variable()
+ self.y.get_variable(),
LinearCombination::<Var, E>::zero() + other.x.get_variable()
+ other.y.get_variable(),
LinearCombination::<Var, E>::zero() + u.get_variable()
);
// Compute A = y2 * x1
let a = other.y.mul(cs.namespace(|| "A computation"), &self.x)?;
// Compute B = x2 * y1
let b = other.x.mul(cs.namespace(|| "B computation"), &self.y)?;
// Compute C = d*A*B
let c = AllocatedNum::alloc(cs.namespace(|| "C"), || {
let mut t0 = *a.get_value().get()?;
t0.mul_assign(b.get_value().get()?);
t0.mul_assign(params.edwards_d());
Ok(t0)
})?;
cs.enforce(
|| "C computation",
LinearCombination::<Var, E>::zero() + (*params.edwards_d(), a.get_variable()),
LinearCombination::<Var, E>::zero() + b.get_variable(),
LinearCombination::<Var, E>::zero() + c.get_variable()
);
// Compute x3 = (A + B) / (1 + C)
let x3 = AllocatedNum::alloc(cs.namespace(|| "x3"), || {
let mut t0 = *a.get_value().get()?;
t0.add_assign(b.get_value().get()?);
let mut t1 = E::Fr::one();
t1.add_assign(c.get_value().get()?);
match t1.inverse() {
Some(t1) => {
t0.mul_assign(&t1);
Ok(t0)
},
None => {
// TODO: add more descriptive error
Err(SynthesisError::AssignmentMissing)
}
}
})?;
let one = cs.one();
cs.enforce(
|| "x3 computation",
LinearCombination::<Var, E>::zero() + one + c.get_variable(),
LinearCombination::<Var, E>::zero() + x3.get_variable(),
LinearCombination::<Var, E>::zero() + a.get_variable()
+ b.get_variable()
);
// Compute y3 = (U - A - B) / (1 - C)
let y3 = AllocatedNum::alloc(cs.namespace(|| "y3"), || {
let mut t0 = *u.get_value().get()?;
t0.sub_assign(a.get_value().get()?);
t0.sub_assign(b.get_value().get()?);
let mut t1 = E::Fr::one();
t1.sub_assign(c.get_value().get()?);
match t1.inverse() {
Some(t1) => {
t0.mul_assign(&t1);
Ok(t0)
},
None => {
// TODO: add more descriptive error
Err(SynthesisError::AssignmentMissing)
}
}
})?;
cs.enforce(
|| "y3 computation",
LinearCombination::<Var, E>::zero() + one - c.get_variable(),
LinearCombination::<Var, E>::zero() + y3.get_variable(),
LinearCombination::<Var, E>::zero() + u.get_variable()
- a.get_variable()
- b.get_variable()
);
Ok(EdwardsPoint {
x: x3,
y: y3
})
}
}
pub struct MontgomeryPoint<E: Engine, Var> { pub struct MontgomeryPoint<E: Engine, Var> {
x: AllocatedNum<E, Var>, x: AllocatedNum<E, Var>,
y: AllocatedNum<E, Var> y: AllocatedNum<E, Var>
} }
impl<E: JubjubEngine, Var: Copy> MontgomeryPoint<E, Var> { impl<E: JubjubEngine, Var: Copy> MontgomeryPoint<E, Var> {
/// Converts an element in the prime order subgroup into
/// a point in the birationally equivalent twisted
/// Edwards curve.
pub fn into_edwards<CS>(
&self,
mut cs: CS,
params: &E::Params
) -> Result<EdwardsPoint<E, Var>, SynthesisError>
where CS: ConstraintSystem<E, Variable=Var>
{
// Compute u = (scale*x) / y
let u = AllocatedNum::alloc(cs.namespace(|| "u"), || {
let mut t0 = *self.x.get_value().get()?;
t0.mul_assign(params.scale());
match self.y.get_value().get()?.inverse() {
Some(invy) => {
t0.mul_assign(&invy);
Ok(t0)
},
None => {
// TODO: add more descriptive error
Err(SynthesisError::AssignmentMissing)
}
}
})?;
cs.enforce(
|| "u computation",
LinearCombination::<Var, E>::zero() + self.y.get_variable(),
LinearCombination::<Var, E>::zero() + u.get_variable(),
LinearCombination::<Var, E>::zero() + (*params.scale(), self.x.get_variable())
);
// Compute v = (x - 1) / (x + 1)
let v = AllocatedNum::alloc(cs.namespace(|| "v"), || {
let mut t0 = *self.x.get_value().get()?;
let mut t1 = t0;
t0.sub_assign(&E::Fr::one());
t1.add_assign(&E::Fr::one());
match t1.inverse() {
Some(t1) => {
t0.mul_assign(&t1);
Ok(t0)
},
None => {
// TODO: add more descriptive error
Err(SynthesisError::AssignmentMissing)
}
}
})?;
let one = cs.one();
cs.enforce(
|| "v computation",
LinearCombination::<Var, E>::zero() + self.x.get_variable()
+ one,
LinearCombination::<Var, E>::zero() + v.get_variable(),
LinearCombination::<Var, E>::zero() + self.x.get_variable()
- one,
);
Ok(EdwardsPoint {
x: u,
y: v
})
}
pub fn group_hash<CS>( pub fn group_hash<CS>(
mut cs: CS, mut cs: CS,
tag: &[Boolean<Var>], tag: &[Boolean<Var>],
@ -352,12 +556,57 @@ mod test {
use ::circuit::test::*; use ::circuit::test::*;
use ::jubjub::{ use ::jubjub::{
montgomery, montgomery,
edwards,
JubjubBls12 JubjubBls12
}; };
use super::{MontgomeryPoint, AllocatedNum, Boolean}; use super::{
MontgomeryPoint,
EdwardsPoint,
AllocatedNum,
Boolean
};
use super::super::boolean::AllocatedBit; use super::super::boolean::AllocatedBit;
use ::group_hash::group_hash; use ::group_hash::group_hash;
#[test]
fn test_into_edwards() {
let params = &JubjubBls12::new();
let rng = &mut XorShiftRng::from_seed([0x3dbe6259, 0x8d313d76, 0x3237db17, 0xe5bc0654]);
for _ in 0..100 {
let mut cs = TestConstraintSystem::<Bls12>::new();
let p = montgomery::Point::<Bls12, _>::rand(rng, params);
let (u, v) = edwards::Point::from_montgomery(&p, params).into_xy();
let (x, y) = p.into_xy().unwrap();
let numx = AllocatedNum::alloc(cs.namespace(|| "mont x"), || {
Ok(x)
}).unwrap();
let numy = AllocatedNum::alloc(cs.namespace(|| "mont y"), || {
Ok(y)
}).unwrap();
let p = MontgomeryPoint::interpret_unchecked(numx, numy);
let q = p.into_edwards(&mut cs, params).unwrap();
assert!(cs.is_satisfied());
assert!(q.x.get_value().unwrap() == u);
assert!(q.y.get_value().unwrap() == v);
cs.set("u/num", rng.gen());
assert_eq!(cs.which_is_unsatisfied().unwrap(), "u computation");
cs.set("u/num", u);
assert!(cs.is_satisfied());
cs.set("v/num", rng.gen());
assert_eq!(cs.which_is_unsatisfied().unwrap(), "v computation");
cs.set("v/num", v);
assert!(cs.is_satisfied());
}
}
#[test] #[test]
fn test_group_hash() { fn test_group_hash() {
let params = &JubjubBls12::new(); let params = &JubjubBls12::new();
@ -493,7 +742,75 @@ mod test {
} }
#[test] #[test]
fn test_addition() { fn test_edwards_addition() {
let params = &JubjubBls12::new();
let rng = &mut XorShiftRng::from_seed([0x5dbe6259, 0x8d313d76, 0x3237db17, 0xe5bc0654]);
for _ in 0..100 {
let p1 = edwards::Point::<Bls12, _>::rand(rng, params);
let p2 = edwards::Point::<Bls12, _>::rand(rng, params);
let p3 = p1.add(&p2, params);
let (x0, y0) = p1.into_xy();
let (x1, y1) = p2.into_xy();
let (x2, y2) = p3.into_xy();
let mut cs = TestConstraintSystem::<Bls12>::new();
let num_x0 = AllocatedNum::alloc(cs.namespace(|| "x0"), || {
Ok(x0)
}).unwrap();
let num_y0 = AllocatedNum::alloc(cs.namespace(|| "y0"), || {
Ok(y0)
}).unwrap();
let num_x1 = AllocatedNum::alloc(cs.namespace(|| "x1"), || {
Ok(x1)
}).unwrap();
let num_y1 = AllocatedNum::alloc(cs.namespace(|| "y1"), || {
Ok(y1)
}).unwrap();
let p1 = EdwardsPoint {
x: num_x0,
y: num_y0
};
let p2 = EdwardsPoint {
x: num_x1,
y: num_y1
};
let p3 = p1.add(cs.namespace(|| "addition"), &p2, params).unwrap();
assert!(cs.is_satisfied());
assert!(p3.x.get_value().unwrap() == x2);
assert!(p3.y.get_value().unwrap() == y2);
let u = cs.get("addition/U/num");
cs.set("addition/U/num", rng.gen());
assert_eq!(cs.which_is_unsatisfied(), Some("addition/U computation"));
cs.set("addition/U/num", u);
assert!(cs.is_satisfied());
let x3 = cs.get("addition/x3/num");
cs.set("addition/x3/num", rng.gen());
assert_eq!(cs.which_is_unsatisfied(), Some("addition/x3 computation"));
cs.set("addition/x3/num", x3);
assert!(cs.is_satisfied());
let y3 = cs.get("addition/y3/num");
cs.set("addition/y3/num", rng.gen());
assert_eq!(cs.which_is_unsatisfied(), Some("addition/y3 computation"));
cs.set("addition/y3/num", y3);
assert!(cs.is_satisfied());
}
}
#[test]
fn test_montgomery_addition() {
let params = &JubjubBls12::new(); let params = &JubjubBls12::new();
let rng = &mut XorShiftRng::from_seed([0x5dbe6259, 0x8d313d76, 0x3237db17, 0xe5bc0654]); let rng = &mut XorShiftRng::from_seed([0x5dbe6259, 0x8d313d76, 0x3237db17, 0xe5bc0654]);